Extensions 1→N→G→Q→1 with N=C₂xC₄.Dic₃ and Q=C₂

Direct product G=NxQ with N=C₂xC₄.Dic₃ and Q=C₂

		d	ρ	Label	ID
C₂²xC₄.Dic₃		96		C2^2xC4.Dic3	192,1340

Semidirect products G=N:Q with N=C₂xC₄.Dic₃ and Q=C₂

extension	φ:Q→Out N	d	ρ	Label	ID
(C₂xC₄.Dic₃):₁C₂ = D₆:₂M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):1C2	192,287
(C₂xC₄.Dic₃):₂C₂ = Dic₃:M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):2C2	192,288
(C₂xC₄.Dic₃):₃C₂ = C₂xC₄²:₄S₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):3C2	192,486
(C₂xC₄.Dic₃):₄C₂ = C₄².₄₇D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):4C2	192,570
(C₂xC₄.Dic₃):₅C₂ = C₁₂:₃M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):5C2	192,571
(C₂xC₄.Dic₃):₆C₂ = (C₂²xC₈):₇S₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):6C2	192,669
(C₂xC₄.Dic₃):₇C₂ = C₂⁴.₆Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):7C2	192,766
(C₂xC₄.Dic₃):₈C₂ = C₄oD₁₂:C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):8C2	192,525
(C₂xC₄.Dic₃):₉C₂ = C₄:C₄:₃₆D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):9C2	192,560
(C₂xC₄.Dic₃):₁₀C₂ = C₄²:₆D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):10C2	192,564
(C₂xC₄.Dic₃):₁₁C₂ = C₄:D₄:S₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):11C2	192,598
(C₂xC₄.Dic₃):₁₂C₂ = C₃:C₈:₅D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):12C2	192,601
(C₂xC₄.Dic₃):₁₃C₂ = C₃:C₈:₆D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):13C2	192,608
(C₂xC₄.Dic₃):₁₄C₂ = D₆:₆M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):14C2	192,685
(C₂xC₄.Dic₃):₁₅C₂ = C₂xC₁₂.₄₆D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):15C2	192,689
(C₂xC₄.Dic₃):₁₆C₂ = M₄(2).₃₁D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):16C2	192,691
(C₂xC₄.Dic₃):₁₇C₂ = (C₆xD₄):₆C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):17C2	192,774
(C₂xC₄.Dic₃):₁₈C₂ = C₂xC₁₂.D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):18C2	192,775
(C₂xC₄.Dic₃):₁₉C₂ = C₄oD₄:₃Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):19C2	192,791
(C₂xC₄.Dic₃):₂₀C₂ = (C₆xD₄).₁₁C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):20C2	192,793
(C₂xC₄.Dic₃):₂₁C₂ = C₂xQ₈:₃Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):21C2	192,794
(C₂xC₄.Dic₃):₂₂C₂ = (C₆xD₄):₉C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):22C2	192,795
(C₂xC₄.Dic₃):₂₃C₂ = (C₆xD₄).₁₆C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):23C2	192,796
(C₂xC₄.Dic₃):₂₄C₂ = C₂xS₃xM₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):24C2	192,1302
(C₂xC₄.Dic₃):₂₅C₂ = M₄(2):₂₆D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):25C2	192,1304
(C₂xC₄.Dic₃):₂₆C₂ = C₂xD₁₂:₆C₂²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):26C2	192,1352
(C₂xC₄.Dic₃):₂₇C₂ = C₂xQ₈.₁₁D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):27C2	192,1367
(C₂xC₄.Dic₃):₂₈C₂ = C₂xD₄.Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):28C2	192,1377
(C₂xC₄.Dic₃):₂₉C₂ = C₁₂.₇₆C₂⁴	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):29C2	192,1378
(C₂xC₄.Dic₃):₃₀C₂ = C₂xD₄:D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3):30C2	192,1379
(C₂xC₄.Dic₃):₃₁C₂ = C₁₂.C₂⁴	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3):31C2	192,1381
(C₂xC₄.Dic₃):₃₂C₂ = C₂xQ₈.₁₄D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3):32C2	192,1382
(C₂xC₄.Dic₃):₃₃C₂ = C₂xC₈oD₁₂	φ: trivial image	96		(C2xC4.Dic3):33C2	192,1297

Non-split extensions G=N.Q with N=C₂xC₄.Dic₃ and Q=C₂

extension	φ:Q→Out N	d	ρ	Label	ID
(C₂xC₄.Dic₃).₁C₂ = C₁₂.₈C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3).1C2	192,82
(C₂xC₄.Dic₃).₂C₂ = C₁₂.₁₀C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).2C2	192,111
(C₂xC₄.Dic₃).₃C₂ = C₁₂:₇M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).3C2	192,483
(C₂xC₄.Dic₃).₄C₂ = Dic₃:C₈:C₂	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).4C2	192,661
(C₂xC₄.Dic₃).₅C₂ = C₂xC₂₄.C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).5C2	192,666
(C₂xC₄.Dic₃).₆C₂ = C₁₂.(C₄:C₄)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).6C2	192,89
(C₂xC₄.Dic₃).₇C₂ = C₄²:₃Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).7C2	192,90
(C₂xC₄.Dic₃).₈C₂ = C₁₂.₂C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48		(C2xC4.Dic3).8C2	192,91
(C₂xC₄.Dic₃).₉C₂ = (C₂xC₁₂).Q₈	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).9C2	192,92
(C₂xC₄.Dic₃).₁₀C₂ = M₄(2):Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).10C2	192,113
(C₂xC₄.Dic₃).₁₁C₂ = (C₂xC₂₄):C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).11C2	192,115
(C₂xC₄.Dic₃).₁₂C₂ = C₁₂.₄C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).12C2	192,117
(C₂xC₄.Dic₃).₁₃C₂ = M₄(2):₄Dic₃	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).13C2	192,118
(C₂xC₄.Dic₃).₁₄C₂ = C₁₂.₂₁C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).14C2	192,119
(C₂xC₄.Dic₃).₁₅C₂ = C₄:C₄.₂₂₅D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).15C2	192,523
(C₂xC₄.Dic₃).₁₆C₂ = C₄:C₄.₂₃₂D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).16C2	192,554
(C₂xC₄.Dic₃).₁₇C₂ = C₁₂.₅C₄²	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).17C2	192,556
(C₂xC₄.Dic₃).₁₈C₂ = C₄².₄₃D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).18C2	192,558
(C₂xC₄.Dic₃).₁₉C₂ = C₄:C₄.₂₃₇D₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).19C2	192,563
(C₂xC₄.Dic₃).₂₀C₂ = C₃:C₈.₆D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).20C2	192,611
(C₂xC₄.Dic₃).₂₁C₂ = Dic₃xM₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).21C2	192,676
(C₂xC₄.Dic₃).₂₂C₂ = Dic₃:₄M₄(2)	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).22C2	192,677
(C₂xC₄.Dic₃).₂₃C₂ = C₂xC₁₂.₅₃D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).23C2	192,682
(C₂xC₄.Dic₃).₂₄C₂ = C₂³.₈Dic₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).24C2	192,683
(C₂xC₄.Dic₃).₂₅C₂ = C₂³.₉Dic₆	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	48	4	(C2xC4.Dic3).25C2	192,684
(C₂xC₄.Dic₃).₂₆C₂ = C₂xC₁₂.₄₇D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).26C2	192,695
(C₂xC₄.Dic₃).₂₇C₂ = (C₆xQ₈):₆C₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).27C2	192,784
(C₂xC₄.Dic₃).₂₈C₂ = C₂xC₁₂.₁₀D₄	φ: C₂/C₁ → C₂ ⊆ Out C₂xC₄.Dic₃	96		(C2xC4.Dic3).28C2	192,785
(C₂xC₄.Dic₃).₂₉C₂ = C₄xC₄.Dic₃	φ: trivial image	96		(C2xC4.Dic3).29C2	192,481
(C₂xC₄.Dic₃).₃₀C₂ = C₁₂.₁₂C₄²	φ: trivial image	96		(C2xC4.Dic3).30C2	192,660

Extensions 1→N→G→Q→1 with N=C2xC4.Dic3 and Q=C2

Extensions 1→N→G→Q→1 with N=C₂xC₄.Dic₃ and Q=C₂